| Quellcodebibliothek Statistik Leitseite products/Sources/formale Sprachen/PVS/measure_integration/ (Beweissystem der NASA Version 6.0.9©) Datei vom 28.9.2014 mit Größe 1 kB |
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Quelle ast_def.pvs Sprache: PVS |
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%-------------------------------------------------------------------------
% Extension of a measure to and outer measure % % Author: David Lester, Manchester University % % Version 1.0 20/08/07 Initial (DRL) % Version 1.1 29/07/09 Now suitable for interval measures % (DRL) %------------------------------------------------------------------------- ast_def[T:TYPE,A:(nonempty?[set[T]])]: THEORY BEGIN ASSUMING IMPORTING subset_algebra_def[T] A_empty: ASSUMPTION A(emptyset) A_fullset: ASSUMPTION A(fullset) A_intersection: ASSUMPTION FORALL (a,b:(A)): A(intersection(a,b)) A_difference: ASSUMPTION FORALL (a,b:(A)): finite_disjoint_union?(A)(difference(a,b)) ENDASSUMING IMPORTING generalized_measure_def[T,A], outer_measure_def[T], extended_nnreal@double_index[set[T]] % Proof Only mu: VAR measure_type z: VAR extended_nnreal epsilon: VAR posreal X: VAR set[T] Y: VAR (A) I: VAR sequence[(A)] a,b: VAR set[T] i,n: VAR nat A_difference_union: LEMMA A(a) AND finite_disjoint_union?(A)(b) => finite_disjoint_union?(A)(difference(a,b)) measure_subadditive: LEMMA A(IUnion(I)) => x_le(mu(IUnion(I)), x_sum(mu o I)) generalized_monotonicity: LEMMA disjoint?(I) AND subset?(IUnion(n,I),Y) AND (FORALL i: i >= n => empty?(I(i))) => x_le(x_sum(mu o I),mu(Y)) generalized_measure_monotone: LEMMA FORALL (a,b:(A),mu): subset?(a,b) => x_le(mu(a),mu(b)) ast(mu):outer_measure = lambda X: % 7.1.3 x_inf({z | EXISTS I: x_eq(x_sum(mu o I),z) AND subset?(X,IUnion(I))}) outer_measure_eq: LEMMA x_eq(ast(mu)(Y),mu(Y)) % 7.1.3 outer_measure_def: LEMMA EXISTS I: subset?(X,IUnion(I)) AND x_le(x_sum(mu o I),x_add(ast(mu)(X),epsilon)) END ast_def ¤ Dauer der Verarbeitung: 0.1 Sekunden (vorverarbeitet) ¤*© Formatika GbR, Deutschland |
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2026-03-28